k-Hypergeometric Series Solutions to One Type of Non-Homogeneous k-Hypergeometric Equations

Abstract: In this paper, we expound on the hypergeometric series solutions for the second-order non-homogeneous k-hypergeometric differential equation with the polynomial term. The general solutions of this equation are obtained in the form of k-hypergeometric series based on the Frobenius method. Lastly, we employ the result of the theorem to find the solutions of several non-homogeneous k-hypergeometric differential equations.

“…We have spotted that by setting p = 1, the various outcomes presented in this article will reduce to some the corresponding outcomes derived earlier in [16,18,19,24,25]. Further, if we let k = 1, then we obtain several interesting new outcomes for the p-extended Gauss and Kummer hypergeometric functions.…”

“…The k-analogue of theta operator kΘ as given in [18,19,25], takes the form kΘ = k ξ dξ . This operator has the particularly pleasant property that kΘξ m = kmξ m , which makes it handy to be used on power series.…”

“…In particular, Diaz and Pariguan [16] introduced the k-analogue of gamma, beta and hypergeometric functions and proved a number of their properties. Since that period, many different results concerning the k-hypergeometric function and related functions have been considered by many researchers, for instance, Agarwal et al [17], Mubeen et al [18][19][20], Rahman et al [21], Chinra et al [22], Korkmaz-Duzgun and Erkus-Duman [23], Nisar et al [24], Li and Dong [25], Yilmaz et al [26] and Yilmazer and Ali [27].…”

Some results on (p, k)-extension of the hypergeometric functions

“…We have spotted that by setting p = 1, the various outcomes presented in this article will reduce to some the corresponding outcomes derived earlier in [16,18,19,24,25]. Further, if we let k = 1, then we obtain several interesting new outcomes for the p-extended Gauss and Kummer hypergeometric functions.…”

“…The k-analogue of theta operator kΘ as given in [18,19,25], takes the form kΘ = k ξ dξ . This operator has the particularly pleasant property that kΘξ m = kmξ m , which makes it handy to be used on power series.…”

“…In particular, Diaz and Pariguan [16] introduced the k-analogue of gamma, beta and hypergeometric functions and proved a number of their properties. Since that period, many different results concerning the k-hypergeometric function and related functions have been considered by many researchers, for instance, Agarwal et al [17], Mubeen et al [18][19][20], Rahman et al [21], Chinra et al [22], Korkmaz-Duzgun and Erkus-Duman [23], Nisar et al [24], Li and Dong [25], Yilmaz et al [26] and Yilmazer and Ali [27].…”

Some results on (p, k)-extension of the hypergeometric functions

“…In [18], some families of multilinear and multilateral generating functions for the k-analogue of the hypergeometric functions were obtained. Studies on this subject are not limited to these papers; for details, see [19][20][21][22].…”

On Some Formulas for the k-Analogue of Appell Functions and Generating Relations via k-Fractional Derivative

“…The solution in the form of the so-called k-hypergeometric series of k-hypergeometric differential equation by utilizing the Frobenius method can be found in the work of Mubeen et al [23,22]. Recently, Li and Dong [14] investigated the hypergeometric series solutions for the second-order non-homogeneous khypergeometric differential equation with the polynomial term. Rahman et al [27,21] proposed the generalization of Wright hypergeometric k-functions and derived its various basic properties.…”

Some properties of generalized (s,k)-Bessel function in two variables